Independent Components of an Indexed Object with Linear Symmetries
Abstract
The problem of finding independent components of an indexed object (e.g., a tensor) with arbitrary number of indices and arbitrary linear symmetries is discussed. It is proved that the number of independent components f(k) is a polynomial of degree not greater than the number of indices n, k being the dimension of the space. Several algorithms to compute f(k) for arbitrary k are described and discussed. It is shown that in the worst case finding f(k) for arbitrary k requires solving at most P(n) systems of linear equations with at most (n!)2 equations for at most of n! unknowns, P(n) being the number of partitions of n. As a by-product, an efficient algorithm to parametrize all components of the object through its independent components is found and implemented in .
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